1 the six trigonometric...

Copyright © Cengage Learning. All rights reserved.

CHAPTER

The Six Trigonometric

Functions1

Copyright © Cengage Learning. All rights reserved.

Definition I: Trigonometric

Functions

SECTION 1.3

Definition I: Trigonometric Functions

In particular, notice that tan can be interpreted as the slope

of the line corresponding to the terminal side of .

Both tan and sec will be undefined when x = 0, which will

occur any time the terminal side of coincides with the

y-axis.

Likewise, both cot and csc will be undefined when y = 0,

which will occur any time the terminal side of coincides with

the x-axis.

Example

Find the six trigonometric functions of if is in standard

position and the point (–2, 3) is on the terminal side of .

Solution:

We begin by making a diagram showing , (–2, 3), and the

distance r from the origin to (–2, 3), as shown in Figure 2.

Figure 2

Solution

Applying the definition for the six trigonometric functions

using the values x = –2, y = 3, and r = we have

See examples 2 and 3 on page 28 of the e-book.

Note: In algebra, when we encounter expressions like

that contain a radical in the denominator, we usually

rationalize the denominator; in this case, by multiplying

the numerator and the denominator by .

In trigonometry, it is sometimes convenient to use

, and at other times it is easier to use .

In most cases we will go ahead and rationalize

denominators, but you should check and see if your

instructor has a preference either way.

The algebraic sign, + or –, of each of the six trigonometric

functions will depend on the quadrant in which

terminates.

Algebraic Signs of Trigonometric Functions

Example

If sin = –5/13, and terminates in quadrant III, find

cos and tan .

Solution:

Because sin = –5/13, we know the ratio of y to r, or y/r, is

–5/13. We can let y be –5 and r be 13 and use these

values of y and r to find x.

The figure shows in standard

position with the point on the

terminal side of having a

y-coordinate of –5.

SolutionTo find x, we use the fact that

Is x the number 12 or –12? Because terminates in

quadrant III, we know any point on its terminal side will

have a negative x-coordinate; therefore

It follows that x = –12, y = –5, and r = 13 in our original

definition, so we have

As Final Note: we should emphasize that the trigonometric

functions of an angle are independent of the choice of the

point (x, y) on the terminal side of the angle.

Consider an angle in standard position. Let points P(x, y)

and P (x , y ) be both points on the terminal side of .

12

Because triangles P OA and POA are similar triangles,

their corresponding sides are proportional.

That is,

Algebraic Signs of Trigonometric Functions